The enumeration of finite rings
Abstract
Let p be a fixed prime. We show that the number of isomorphism classes of finite rings of order pn is pα, where α=427n3+O(n5/2). This result was stated (with a weaker error term) by Kruse and Price in 1969; a problem with their proof was pointed out by Knopfmacher in 1973. We also show that the number of isomorphism classes of finite commutative rings of order pn is pβ, where β=227n3+O(n5/2). This result was stated (again with a weaker error term) by Poonen in 2008, with a proof that relies on the problematic step in Kruse and Price's argument.
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